Inverse semigroups and combinatorial C*-algebras

Abstract: We describe a special class of representations of an inverse semigroup S on Hilbert's space which we term tight. These representations are supported on a subset of the spectrum of the idempotent semilattice of S, called the tight spectrum, which is in turn shown to be precisely the closure of the space of ultra-filters, once filters are identified with semicharacters in a natural way. These representations are moreover shown to correspond to representations of the C*-algebra of the groupoid of germs for the ac… Show more

“…, where G θ is the groupoid constructed in [1] from a partial action θ of a discrete group G on a totally disconnect locally compact Hausdorff space X , and c φ : G θ → Γ is the cocycle induced by a group homomorphism φ : G → Γ such that the group-ring R(ker φ ) has no zero-divisors and only trivial units; • the pair (G tight (S ), c φ ), where G tight (S ) is the tight groupoid of an E * -unitary inverse semigroup (see [23,24]), and c φ is the cocycle induced by a homomorphism φ : S → Γ such that there is a dense subset X ⊆Ê tight such that the groupring R(G x ), where G x is the group {[s, x] ∈ G tight (S ) : φ (s) = e, θ s (x) = x}, has no zero-divisors and only trivial units for all x ∈ X .…”

Diagonal-preserving graded isomorphisms of Steinberg algebras

“…, where G θ is the groupoid constructed in [1] from a partial action θ of a discrete group G on a totally disconnect locally compact Hausdorff space X , and c φ : G θ → Γ is the cocycle induced by a group homomorphism φ : G → Γ such that the group-ring R(ker φ ) has no zero-divisors and only trivial units; • the pair (G tight (S ), c φ ), where G tight (S ) is the tight groupoid of an E * -unitary inverse semigroup (see [23,24]), and c φ is the cocycle induced by a homomorphism φ : S → Γ such that there is a dense subset X ⊆Ê tight such that the groupring R(G x ), where G x is the group {[s, x] ∈ G tight (S ) : φ (s) = e, θ s (x) = x}, has no zero-divisors and only trivial units for all x ∈ X .…”

Diagonal-preserving graded isomorphisms of Steinberg algebras

“…We begin with the following well-known result (see [4] and also [6]): (1) , that is, S = G (1) , and that for all s, t ∈ S and g ∈ s ∩ t, there is r ∈ S with g ∈ r ⊆ s ∩ t.…”

“…With a different, Hausdorff topology, this action of S has already been studied in [4,8]. Our non-Hausdorff topology has the following crucial feature: if Gr(S) is the étale groupoid of germs for the action of S onÊ, then the category of actions of S on topological spaces is equivalent to the category of actions of Gr(S) on topological spaces.…”

Inverse semigroup actions as groupoid actions

“…If B and L are countable then, since G tight (T ) is the tight groupoid of an countable * -inverse semigroup, G tight (T ) is anétale, second countable, topological groupoid [13]. We know that G tight (T ) is Hausdorff and amenable.…”

C⁎-algebras associated to Boolean dynamical systems